Irreducible representations of certain nilpotent groups of finite rank
Abstract
In the paper we study irreducible representations of some nilpotent groups of finite abelian total rank. The main result of the paper states that if a torsion-free minimax group G of nilpotency class 2 admits a faithful irreducible representation over a finitely generated field k such that chark Sp(G) then there exist a subgroup N and an irreducible primitive representation of the subgroup N over k such that the representation is induced from and the quotient group N/Ker is finitely generated.
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